Complexity of Homogeneous Co-Boolean Constraint Satisfaction Problems
Computational Complexity
2010-11-23 v1
Abstract
Constraint Satisfaction Problems (CSP) constitute a convenient way to capture many combinatorial problems. The general CSP is known to be NP-complete, but its complexity depends on a template, usually a set of relations, upon which they are constructed. Following this template, there exist tractable and intractable instances of CSPs. It has been proved that for each CSP problem over a given set of relations there exists a corresponding CSP problem over graphs of unary functions belonging to the same complexity class. In this short note we show a dichotomy theorem for every finite domain D of CSP built upon graphs of homogeneous co-Boolean functions, i.e., unary functions sharing the Boolean range {0, 1}.
Cite
@article{arxiv.1011.4744,
title = {Complexity of Homogeneous Co-Boolean Constraint Satisfaction Problems},
author = {Florian Richoux},
journal= {arXiv preprint arXiv:1011.4744},
year = {2010}
}
Comments
9 pages